Let S be the set of the first 21 natural numbers, then the probability of
choosing `{x, y}inS`, such that `x^3+y^3` is divisible by `3,` is

Let S be the set of the first 21 natural numbers, then the probability of Choosing {x,y,z}subeS , such that x,y,z are in AP, is

Let S be the set of the first 21 natural numbers, then the probability of Choosing {x,y,z}subeS , such that x,y,z are not consecutive is,

If three distinct numbers are chosen randomly from the first 100 natural numbers, then the probability that all three of then are divisible by 2 or 3, is

If three numbers are selected from the set of the first 20 natural numbers, the probability that they are in GP, is

Let N be the set of natural numbers and the relation R be defined on N such that R={(x,y) : y=2x, y in N} ,

Taking the set of natural numbers as the universal set, write down the complements of the following sets: { x : x is a natural number divisible by 3 and 5}

Taking the set of natural numbers as the universal set, write down the complement of the following sets. {x : x is a natural number divisible by 2 and 3}

Let A be the set of the children in a family. The relation ‘x is a brother of y' relation on A is

A die is tossed. The probability that the number on a die is divisible by 3 is …….

Activity: Ask all the students in your class to write a 3-digit number. Choose any student from the room at random. What is the probability that the number written by her/him is divisible by 3? Remember that a number is divisible by 3, if the sum of its digits is divisible by 3.